Method and apparatus using IDS™ for multi-agent therapy

ABSTRACT

A method and apparatus using IDS(TM) technology to calculate new agent doses in a multi-agent therapy. The overall proportion of each agent is determined by the amount of agent as it relates to the dosing range. The overall proportion as well as the intrinsic potency of the agent is used to determine the total proportional effect which each agent has on the surrogate marker. This parameter is then inserted into the four-parameter equation for calculating dose by adjusting the proportional change in marker that is attributed to the activity of the agent.

This document may contain material which is the subject of copyright protection. All rights in such copyrightable material are hereby reserved.

FIELD OF THE INVENTION

The present invention relates generally to a method and apparatus using IDS™ (Intelligent Dosing System™) technology for multi-agent therapy. More particularly, the present invention relates to a method and apparatus for use in treating a patient with multiple agents to optimize therapy and to prevent an adverse response. The present invention can utilize either biological substance levels or other surrogate markers to determine the effectiveness of the dosing regimen and, if necessary, to suggest a new more optimal regimen.

The term “agent” as used herein includes, but is not limited to: vaccines; serums; drugs; adjuvants to enhance or modulate a resulting immune response; vitamin antagonists; medications; autologous whole-cell vaccines (using cells derived from a patient's own tumor); allogenic whole-cell vaccines (using cancer cell lines established in vitro and then used to vaccinate multiple patients); tumor specific antigen/tumor associated antigen (TSA/TAA) based vaccines and hormonal autoimmunization approaches; all other cancer vaccines; Melacine; CancerVax; immune-boosting interferon; peptides; dendritic cells having melanoma protein thereon; interleukin-12; substances which stimulate or energize blood cells known as CD8 T cells; genes which make interleukin-12; tumor cells weakened by genes which make interleukin-12; substances which block blood-vessel formation to prevent growth of tumors; immunized cells; recombinant subunit vaccines; DNA vaccines; live recombinant viral vector vaccines; live recombinant bacterial vector vaccines; live-attenuated vaccines; whole-inactivated vaccines; virus-like particle vaccines; synthetic peptide vaccines; “Jennerian” vaccines; complex vaccines; and combinations of two or more of the foregoing.

The term “surrogate marker” as used herein means all surrogate markers and includes, but is not limited to: a measurement of biological activity within the body which indirectly indicates the effect of treatment on a disease state or on any condition being treated; and any measurement taken on a patient which relates to the patient's response to an intervention, such as the intervention of a biological substance introduced into or on the patient. For example, CD4 cell counts and viral load are examples of surrogate markers in HIV infection.

BACKGROUND OF THE INVENTION

When a patient begins taking an agent or any medication for a length of time, a titration of the amount of agent taken by the patient is necessary in order to achieve the optimal benefit of the agent, and at the same time to prevent any undesirable side effects that taking too much of the agent could produce. Thus, there is a continuous balance between taking enough of the agent in order to gain the benefits from that agent, and at the same time not taking so much agent as to illicit a toxic event.

There is large inter-individual variability in the patient biological interactions and/or the patient pharmocodynamic and pharmacokinetic interactions of agents. What may be an appropriate agent dose for one individual, may be too much or too little for another. A physician was required to estimate the correct agent dosage for a patient and then to experiment with that dosage, usually by trial and error, until the correct dosage was achieved. Likewise, the FDA labeling of a agent suggests dosages based on epidemiological studies and again does not account for inter-individual variability. Non-linear least squares modeling methods involve the use of large amounts of data relating to a general population in order to calculate a best fit. Much like linear regression models, this method cannot take into account the variability between people with the same population characteristics.

Bayesian analysis is another method used to relate agent dose to efficacy. This method employs large-scale population parameters to stratify a population in order to better characterize the individuals. This method does not take into account the changes that can occur within a person over time, and as a result cannot reliably estimate dosages.

Pharmacokinetic compartment modeling has had success with some agents, but because the models are static and cannot adapt themselves to changes within a population or a patient, they are once again undesirable for dynamically determining agent dosages.

Expert systems have been developed using similar technology to predict specific drug dosages for specific immunosuppressant drugs (see, e.g., U.S. Pat. Nos. 5,365,948, 5,542,436 and 5,694,950). These algorithms, however, are not generic and only use immunosuppressant blood levels. Each algorithm is specific to an individual specific immunosuppressant drug. As it stands, these inventions cannot be applied to other agents and do not have a non-linear feedback loop mechanism.

Applicant's U.S. Pat. No. 6,267,116 discloses a major breakthrough in IDS™ technology, but can only accommodate one drug at a time.

It is a desideratum of the present invention to avoid the animadversions of conventional systems and techniques

SUMMARY OF THE INVENTION

The present invention provides in one embodiment thereof a method of calculating the next best dose for each agent of a multi-agent therapy which a patient may be using, comprising the steps of: accepting as first inputs the patient's current doses of a plurality of agents which the patient may be using; accepting as second inputs one or more numerical markers indicating one or more responses of the patient; and calculating new agent doses for said plurality of agents as a function of said first inputs, said second inputs, and contributions which each agent makes to an overall effect to be achieved by said multi-agent therapy.

The present invention provides in a further embodiment thereof a storage device having stored thereon an ordered set of instructions which, when executed by a computer, performs a predetermined method, comprising: first means for accepting as first inputs a patient's current doses of a plurality of agents which the patient may be using; second means for accepting as second inputs one or more numerical markers indicating one or more responses of the patient; and third means for calculating new agent doses for said plurality of agents as a function of said first inputs, said second inputs, and contributions which each agent makes to an overall effect to be achieved by said multi-agent therapy.

The present invention provides in another embodiment thereof an apparatus for calculating the next best dose for each agent of a multi-agent therapy which a patient may be using, comprising: first means for accepting as first inputs the patient's current doses of a plurality of agents which the patient may be using; second means for accepting as second inputs one or more numerical markers indicating one or more responses of the patient; and third means for calculating new agent doses for said plurality of agents as a function of said first inputs, said second inputs, and contributions which each agent makes to an overall effect to be achieved by said multi-agent therapy.

DESCRIPTION OF THE DRAWINGS

FIG. 1 shows a flow chart of the process by which new doses of an agent, of a multi-agent therapy, are determined according to a portion of the method of the invention.

FIG. 2 shows an apparatus for use in calculating new doses of a plurality of agents used in a multi-agent therapy according to the invention.

DETAILED DESCRIPTION OF THE INVENTION

FIG. 1 shows a flow chart of a portion of the overall process of treating a patient using this expert system. The actual expert system performs many steps which are described herein, whereas only the steps shown in blocks 10 and 12 are generally indicated the flow chart.

This expert system includes a general purpose computer, shown in FIG. 2, comprising an input means, preferably a keyboard 20 and/or a mouse 22, an output means 30, preferably a video display screen, a data storage means 50, preferably a hard disk drive, and a processor. The expert computer program receives input data from a physician regarding the patient's current agent dose, the maximal dose range for that particular agent, and the percent response of the patient based on the surrogate markers used to monitor that agent.

Also characterized is the patient's response to the last dosing cycle as well as a dose response constant. This allows the expert system to individualize the patient dosing based on the patient's individual response to that particular agent. The system calculates a revised dosage based on the data input by the physician.

The software portion of the invention includes a user interface portion 100 to receive the input data and to output the revised dosage information, and a data analysis portion 110, which calculates the new dosage information based on the input data.

A physician prescribes a agent for a patient based on the FDA recommended dose on the label of the agent. The physician then re-evaluates the patient, usually daily, either in person or remotely depending on the agent being prescribed.

During the subsequent evaluations by the physician, the surrogate markers are monitored and sequentially compared to determine if there are, any toxicities associated with the agent. Also the numerical markers will be evaluated to see if the desired effect of the agent is being achieved.

Given the effectiveness of the agent's action relative to the surrogate markers, a change in agent dose is calculated by the system. Conversely, by employing this system, one could determine the expected result of the agent dose change on the surrogate marker.

The present invention will now be described in detail with respect to 2-agent IDS™ therapy and 3-agent IDS™ therapy, although it is applicable to any number of agents.

Using the IDS™ With Multi-agent (2 Agents) Therapy

When using a multi-agent regimen to treat patients it is necessary to calculate the next best dose for each agent the patient is using. The IDS™ technology in the form disclosed in applicant's U.S. Pat. No. 6,267,116 can only dose one agent at a time. The following calculations show how to use the concept, of the IDS™ and the dose response methodology to perform multiple computations, each based on the proportional response which a particular agent has on the overall response that is to be achieved.

The concept underlying this multi-agent dosing model is that each agent has some contribution to the overall effect. This contribution is determined by the amount of each agent the patient is using as well as the intrinsic potency of each agent. The overall proportion of each agent is determined by the amount of agent as it relates to the dosing range. The overall proportion as well as the intrinsic potency of the agent is used determine the total proportional effect which each agent has on the surrogate marker. This parameter (FOE1 or FOE2) is then inserted into the four-parameter equation (AND) for calculating dose by adjusting the proportional change in marker that is attributed to the activity of the agent.

To Calculate the First Agent

NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1}+LV1

To Calculate the Second Agent

NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2

where:

EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1

EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1

if CANM1<DANM1 and EANM2>CANM1,

or

if CANM1>DANM1 and EANM2<CANM1,

then

LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)]

if CANM1<DANM1 and EANM2<CANM1,

or

if CANM1>DANM1 and EANM2>CANM1,

then

LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)]

if CANM2<DANM2 and EANM2>CANM2,

or

if CANM2>DANM2 and EANM2<CANM2,

then

LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)]

if CANM2<DANM2 and EANM2<CANM2,

or

if CANM2>DANM2 and EANM2>CANM2,

then

LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)]

PAD1=Previous agent dose of the first agent

PAD2=Previous agent dose of the second agent

CAD1=Current agent dose of the first agent

CAD2=Current agent dose of the second agent

NAD1=New agent dose of the first agent

NAD2=New agent dose of the second agent

PADM1=Previous agent numerical marker for the first agent

CANM1=Current agent numerical marker for the first agent

CANM2=Current agent numerical marker for the second agent

DANM1=Desired agent numerical marker for the first agent

DANM2=Desired agent numerical marker for the second agent

FOE1=Factor of effect the first agent has on its associated numerical marker

FOE2=Factor of effect the second agent has on its associated numerical marker

HIGH1=The input parameter that is the high dose range for the first agent

HIGH2=The input parameter that is the high dose range for the second agent

RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent

RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent

1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1)

1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2)

To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect

Agent1 Effect=1

Agent2 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent2}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}$

EXAMPLE

Gemzar Dose is 5000

Taxol Dose is 250

Assume both agents have an equal effect.

Current Marker (ANC) is 0.5

Desired Marker (ANC) is 1.8 ${{Taxol}\quad {Proportion}} = {\frac{250/50}{\left( {{250/500} + {5000/3300}} \right)} = {\frac{0.5}{2.0152} = 0.2481}}$ ${{Gemzar}\quad {Proportion}} = {\frac{5000/3300}{\left( {{250/500} + {5000/3300}} \right)} = {\frac{1.5152}{2.0152} = 0.7519}}$ ${{Total}\quad {Proportional}\quad {Taxol}\quad {Effect}} = {{\frac{250/500}{\left( {{250/500} + {5000/3300}} \right)} \times 1} = 0.2481}$ ${{Total}\quad {Proportional}\quad {Gemzar}\quad {Effect}} = {{\frac{5000/3300}{\left( {{250/500} + {5000/3300}} \right)} \times 1} = 0.7519}$

 FOE1=0.2481/(0.2481+0.7519)=0.2481

FOE2=0.7519/(0.2481+0.7519)=0.7519

Calculate Taxol Dose ${{New}\quad {Taxol}\quad {Dose}\quad ({NAD1})} = {250 - \left\{ {\left\lbrack \frac{\frac{\left( {1.8 - 0.5} \right) \times 0.2481}{0.5}}{1 + \left( {250/500} \right)} \right\rbrack \times 250} \right\}}$ ${{New}\quad {Taxol}\quad {Dose}\quad ({NAD1})} = {250 - \left\{ {\left\lbrack \frac{\frac{0.3225}{0.5}}{1.5} \right\rbrack \times 250} \right\}}$

 New Taxol Dose (NAD1)=250−{0.4300×250}

New Taxol Dose (NAD1)=250−107.5

New Taxol Dose (NAD1)=142.5

Calculate Gemzar Dose ${{New}\quad {Gemzar}\quad {Dose}\quad ({NAD2})} = {5000 - \left\{ {\left\lbrack \frac{\frac{\left( {1.8 - 0.5} \right) \times 0.7519}{0.5}}{1 + \left( {5000/3300} \right)} \right\rbrack \times 5000} \right\}}$ ${{New}\quad {Gemzar}\quad {Dose}\quad ({NAD2})} = {5000 - \left\{ {\left\lbrack \frac{1.1884}{2.5152} \right\rbrack \times 5000} \right\}}$

 New Gemzar Dose (NAD2)=5000−{0.7725×5000}

New Gemzar Dose (NAD2)=5000−3862.5

New Gemzar Dose (NAD2)=1137.5

Loop Math

EANM1={[−1×(250−350)/350]×[1+(350/500)]×0.4}+0.4

Note: × by −1 because PAD1>CAD1

EANM1={[0.2857×1.7]×0.4}+0.4

EANM1={0.4857×0.4}+0.4

EANM1=0.5943

EANM2={[−1×(5000−6000)/6000]×[1+(6000/3300)]×0.5943}+0.5943

Note: × by −1 because PAD2>CAD2

EANM2={[0.1667×2.8182]×0.5943}+0.5943

EANM2={0.4698×0.5943}+0.5943

EANM2=0.8735

LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}A(CAD/HIGH)]

LV1=−[0.2×250×(0.6−0.8735)/0.6]/[1.3{circumflex over ( )}(250/500)]

LV1=−[50×−0.4558]/1.1402

LV1=19.99

LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)]

LV2=−[0.2×5000×(0.6−0.8735)/0.6]/[1.3{circumflex over ( )}(5000/3300)]

LV2=−[1000×−0.4558]/1.4882

 LV2=306.276

Using the IDS™ With Multi-agent (3 Agents) Therapy

When using a multi-agent regimen to treat patients it is necessary to calculate the next best dose for each agent the patient is using. The IDS™ technology in the form disclosed in applicant's U.S. Pat. No. 6,267,116 can only dose one agent at a time. The following calculations show how to use the concept of the IDS™ and the dose response methodology to perform multiple computations, each based on the proportional response which a particular agent has on the overall response that is to be achieved.

The concept underlying this multi-agent dosing model is that each agent has some contribution to the overall effect. This contribution is determined by the amount of each agent the patient is using as well as the intrinsic potency of each agent. The overall proportion of each agent is determined by the amount of agent as it relates to the dosing range. The overall proportion as well as the intrinsic potency of the agent is used to determine the total proportional effect which each agent has on the surrogate marker. This parameter (FOE1, FOE2, or FOE3) is then inserted into the four-parameter equation (AND) for calculating dose by adjusting the proportional change in marker that is attributed to the activity of the agent.

To Calculate the First Agent

NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1+LV1

To Calculate the Second Agent

NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2

To Calculate the Third Agent

NAD3=CAD3−{[<(DANM3−CANM3)×FOE3>/<1+(CAD3/HIGH3)>]×CAD3}+LV3

where:

EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1

EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1

 EANM3={[(CAD3−PAD3)/PAD3]×[1+(PAD3/HIGH3)]×EANM2}+EANM2

if CANM1<DANM1 and EANM2>CANM1,

or

if CANM1>DANM1 and EANM2<CANM1,

then

LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)]

if CANM1<DANM1 and EANM2<CANM1,

or

if CANM1>DANM1 and EANM2>CANM1,

then

LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)]

if CANM2<DANM2 and EANM2>CANM2,

or

if CANM2>DANM2 and EANM2<CANM2,

then

LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)]

if CANM2<DANM2 and EANM2<CANM2,

or

if CANM2>DANM2 and EANM2>CANM2,

then

LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)]

if CANM3<DANM3 and EANM3>CANM3,

or

if CANM3>DANM3 and EANM3<CANM3,

then

LV3=RESPONSE3×CAD3×(EANM3−CANM3)/CANM3/[1.3{circumflex over ( )}(CAD3/HIGH3)]

if CANM3<DANM3 and EANM3<CANM3,

or

if CANM3>DANM3 and EANM3>CANM3,

then

LV3=−[RESPONSE3×CAD3×(CANM3−EANM3)/CANM3]/[1.3{circumflex over ( )}(CAD3/HIGH3)]

PAD1=Previous agent dose of the first agent

PAD2=Previous agent dose of the second agent

PAD3=Previous agent dose of the third agent

CAD1=Current agent dose of the first agent

CAD2=Current agent dose of the second agent

CAD3=Current agent dose of the third agent

NAD1=New agent dose of the first agent

NAD2=New agent dose of the second agent

NAD3=New agent dose of the third agent

PADM1=Previous agent numerical marker for the first agent

CANM1=Current agent numerical marker for the first agent

CANM2=Current agent numerical marker for the second agent

CANM3=Current agent numerical marker for the third agent

DANM1=Desired agent numerical marker for the first agent

DANM2=Desired agent numerical marker for the second agent

DANM3=Desired agent numerical marker for the third agent

FOE1=Factor of effect the first agent has on its associated numerical marker

FOE2=Factor of effect the second agent has on its associated numerical marker

FOE3=Factor of effect the third agent has on its associated numerical marker

HIGH1=The input parameter that is the high dose range for the first agent

HIGH2=The input parameter that is the high dose range for the second agent

HIGH3=The input parameter that is the high dose range for the third agent

RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent

RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent

RESPONSE3=Percent of total dose available for individualizing patient dose of the third agent

1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1)

1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2)

1.3{circumflex over ( )}(CAD3/HIGH3)=1.3 raised to an exponent of (CAD3/HIGH3)

To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect

Agent1 Effect=1

Agent2 Effect=1

Agent3 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent3}\quad {Proportion}} = \frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect3}} = {\frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent3}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE3} = \frac{{Total}\quad {Proportional}\quad {Effect3}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$

Using the IDS™ With Multi-agent (n Agents) Therapy

The concept underlying this multi-agent dosing model is that each agent has some contribution to the overall effect. This contribution is determined by the amount of each agent the patient is using as well as the intrinsic potency of each agent. The overall proportion of each agent is determined by the amount of agent as it relates to the dosing range. The overall proportion as well as the intrinsic potency of the agent is used to determine the total proportional effect which each agent has on the surrogate marker. This parameter (FOE1, FOE2 . . . FOEn) is then inserted into the four-parameter equation (NAD1, NAD2 . . . NADn) for calculating dose by adjusting the proportional change in marker that is attributed to the activity of the agent.

To Calculate the First Agent

NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1+LV1

To Calculate the Second Agent

NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2

To Calculate the nth Agent

NADn=CADn−{[<(DANMn−CANMn)×FOEn>/<1+(CADn/HIGHn)>]×CADn}+LVn

where:

EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1

EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1

EANMn={[(CADn−PADn)/PADn]×[1+(PADn/HIGHn)]×EANM_(n−1)}+EANM_(n−1)

if CANM1<DANM1 and EANM2>CANM1,

or

if CANM1>DANM1 and EANM2<CANM1,

then

LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)]

if CANM1<DANM1 and EANM2<CANM1,

or

if CANM1>DANM1 and EANM2>CANM1,

then

LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)]

if CANM2<DANM2 and EANM2>CANM2,

or

if CANM2>DANM2 and EANM2<CANM2,

then

LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)]

if CANM2<DANM2 and EANM2<CANM2,

or

if CANM2>DANM2 and EANM2>CANM2,

then

LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)]

. . .

LVn=RESPONSEn×CADn×(EANMn−CANMn)/CANMn/[1.3{circumflex over ( )}(CADn/HIGHn)]

PAD1=Previous agent dose of the first agent

PAD2=Previous agent dose of the second agent

PADn=Previous agent dose of the nth agent

CAD1=Current agent dose of the first agent

CAD2=Current agent dose of the second agent

CADn=Current agent dose of the nth agent

NAD1=New agent dose of the first agent

NAD2=New agent dose of the second agent

NADn=New agent dose of the nth agent

PADM1=Previous agent numerical marker for the first agent

CANM1=Current agent numerical marker for the first agent

CANM2=Current agent numerical marker for the second agent

CANMn=Current agent numerical marker for the nth agent

DANM1=Desired agent numerical marker for the first agent

DANM2=Desired agent numerical marker for the second agent

DANMn=Desired agent numerical marker for the nth agent

FOE1=Factor of effect the first agent has on its associated numerical marker

FOE2=Factor of effect the second agent has on its associated numerical marker

FOEn=Factor of effect the nth agent has on its associated numerical marker

HIGH1=The input parameter that is the high dose range for the first agent

HIGH2=The input parameter that is the high dose range for the second agent

HIGHn=The input parameter that is the high dose range for the nth agent

RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent

RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent

RESPONSEn=Percent of total dose available for individualizing patient dose of the nth agent

1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1)

1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2)

1.3{circumflex over ( )}(CADn/HIGHn)=1.3 raised to an exponent of (CADn/HIGHn)

To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect

Agent1 Effect=1

Agent2 Effect=1

Agent n Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent}\quad n\quad {Proportion}} = \frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect}\quad n} = {\frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent}\quad n\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOEn} = \frac{{Total}\quad {Proportional}\quad {Effect}\quad n}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$

Although the invention has been described in detail in the foregoing for the purpose of illustration, it is to be understood that such detail is solely for that purpose and that variations can be made therein by those of ordinary skill in the art without departing from the spirit and scope of the invention as defined by the following claims, including all equivalents thereof. 

What is claimed is:
 1. A method of calculating the next best dose for each agent of a multi-agent therapy which a patient may be using, comprising the steps of: accepting as first inputs the patient's current doses of a plurality of agents which the patient may be using; accepting as second inputs one or more numerical markers indicating one or more responses of the patient; and calculating new agent doses for said plurality of agents as a function of said first inputs, said second inputs, and contributions each agent makes to an overall effect to be achieved by said multi-agent therapy.
 2. The method according to claim 1, wherein said calculating is performed as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1)>/<1+(CAD1/HIGH1)>]×CAD1}+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent2}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}$ ${FOE2} = {\frac{{Total}\quad {Proportional}\quad {Effect2}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}.}$


3. The method according to claim 1, wherein said calculating is performed as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1}+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2 To Calculate the Third Agent NAD3=CAD3−{[<(DANM3−CANM3)×FOE3>/<1+(CAD3/HIGH3)>]×CAD3}+LV3  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 EANM3={[(CAD3−PAD3)/PAD3]×[1+(PAD3/HIGH3)]×EANM2}+EANM2 if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then  LV1−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM3<DANM3 and EANM3>CANM3, or if CANM3>DANM3 and EANM3<CANM3, then LV3=RESPONSE3×CAD3×(EANM3−CANM3)/CANM3/[1.3{circumflex over ( )}(CAD3/HIGH3)] if CANM3<DANM3 and EANM3<CANM3, or if CANM3>DANM3 and EANM3>CANM3, then LV3=−[RESPONSE3×CAD3×(CANM3−EANM3)/CANM3]/[1.3{circumflex over ( )}(CAD3/HIGH3)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent PAD3=Previous agent dose of the third agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent CAD3=Current agent dose of the third agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent NAD3=New agent dose of the third agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent CANM3=Current agent numerical marker for the third agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent DANM3=Desired agent numerical marker for the third agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker FOE3=Factor of effect the third agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent HIGH3=The input parameter that is the high dose range for the third agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent RESPONSE3=Percent of total dose available for individualizing patient dose of the third agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) 1.3{circumflex over ( )}(CAD3/HIGH3)=1.3 raised to an exponent of (CAD3/HIGH3) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 Agent3 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent3}\quad {Proportion}} = \frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect3}} = {\frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent3}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE3} = {\frac{{Total}\quad {Proportional}\quad {Effect3}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}.}$


4. The method according to claim 1, wherein said multi-agent therapy uses n agents, and said calculating is performed as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2 To Calculate the nth Agent NADn=CADn−{[<(DANMn−CANMn)×FOEn>/<1+(CADn/HIGHn)>]×CADn}+LVn  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 EANMn={[(CADn−PADn)/PADn]×[1+(PADn/HIGHn)]×EANM_(n−1)}+EANM_(n−1) if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] . . . LVn=RESPONSEn×CADn×(TEANM−CANMn)/CANMn/[1.3{circumflex over ( )}(CADn/HIGHn)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent PADn=Previous agent dose of the nth agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent CADn=Current agent dose of the nth agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent NADn=New agent dose of the nth agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent CANMn=Current agent numerical marker for the nth agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent DANMn=Desired agent numerical marker for the nth agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker FOEn=Factor of effect the nth agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent HIGHn=The input parameter that is the high dose range for the nth agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent RESPONSEn=Percent of total dose available for individualizing patient dose of the nth agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) 1.3{circumflex over ( )}(CADn/HIGHn)=1.3 raised to an exponent of (CADn/HIGHn) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 Agent n Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent}\quad n\quad {Proportion}} = \frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Total}\quad {Proportion}\quad {al}\quad {Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect}\quad n} = {\frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent}\quad n\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOEn} = {\frac{{Total}\quad {Proportional}\quad {Effect}\quad n}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}.}$


5. A storage device having stored thereon an ordered set of instructions which, when executed by a computer, performs a predetermined method, comprising: first means for accepting as first inputs a patient's current doses of a plurality of agents which the patient may be using in a multi-agent therapy second means for accepting as second inputs one or more numerical markers indicating one or more responses of the patient; and third means for calculating new agent doses for said plurality of agents as a function of said first inputs, said second inputs, and contributions which each agent makes to an overall effect to be achieved by said multi-agent therapy.
 6. The device according to claim 5, wherein said third means calculates said new agent doses as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1}+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent2}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}$ ${FOE2} = {\frac{{Total}\quad {Proportional}\quad {Effect2}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}.}$


7. The device according to claim 5, wherein said third means calculates said new agent doses as follows: To Calculate the First Agent  NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1}+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2 To Calculate the Third Agent NAD3=CAD3−{[<(DANM3−CANM3)×FOEn>/<1+(CAD3/HIGH3)>]×CAD3}+LV3  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 EANM3={[(CAD3−PAD3)/PAD3]×[1+(PAD3/HIGH3)]×EANM2}+EANM2 if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM3<DANM3 and EANM3>CANM3, or if CANM3>DANM3 and EANM3<CANM3, then  LV3=RESPONSE3×CAD3×(EANM3−CANM3)/CANM3/[1.3{circumflex over ( )}(CAD3/HIGH3)] if CANM3<DANM3 and EANM3<CANM3, or if CANM3>DANM3 and EANM3>CANM3, then LV3=−[RESPONSE3×CAD3×(CANM3−EANM3)/CANM3]/[1.3{circumflex over ( )}(CAD3/HIGH3)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent PAD3=Previous agent dose of the third agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent CAD3=Current agent dose of the third agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent NAD3=New agent dose of the third agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent CANM3=Current agent numerical marker for the third agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent DANM2=Desired agent numerical marker for the third agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker FOE3=Factor of effect the third agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent HIGH2=The input parameter that is the high dose range for the third agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent RESPONSE2=Percent of total dose available for individualizing patient dose of the third agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) 1.3{circumflex over ( )}(CAD3/HIGH3)=1.3 raised to an exponent of (CAD3/HIGH3) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 Agent3 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent3}\quad {Proportion}} = \frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect3}} = {\frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent3}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE3} = {\frac{{Total}\quad {Proportional}\quad {Effect3}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}.}$


8. The device according to claim 5, wherein said multi-agent therapy uses n agents, and said third means calculates said new agent does as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1>]×CAD1+LV1 To Calculate the Second Agent  NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2 To Calculate the nth Agent NADn=CADn−{[<(DANMn−CANMn)×FOEn>/<1+(CADn/HIGHn)>]×CADn}+LVn  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 EANMn={[(CADn−PADn)/PADn]×[1+(PADn/HIGHn)]×EANM_(n−1)}+EANM_(n−1) if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2) . . . LVn=RESPONSEn×CADn×(TEANM−CANMn)/CANMn/[1.3{circumflex over ( )}(CADn/HIGHn)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent PADn=Previous agent dose of the nth agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent CADn=Current agent dose of the nth agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent NADn=New agent dose of the nth agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent CANMn=Current agent numerical marker for the nth agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent DANMn=Desired agent numerical marker for the nth agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker FOEn=Factor of effect the nth agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent HIGHn=The input parameter that is the high dose range for the nth agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent RESPONSEn=Percent of total dose available for individualizing patient dose of the nth agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) 1.3{circumflex over ( )}(CADn/HIGHn)=1.3 raised to an exponent of (CADn/HIGHn) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 Agent n Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent}\quad n\quad {Proportion}} = \frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect}\quad n} = {\frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent}\quad n\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOEn} = {\frac{{Total}\quad {Proportional}\quad {Effect}\quad n}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}.}$


9. An apparatus for calculating the next best dose for each agent of a multi-agent therapy which a patient may be using, comprising: first means for accepting as first inputs the patient's current doses of a plurality of agents which the patient may be using; second means for accepting as second inputs one or more numerical markers indicating one or more responses of the patient; and third means for calculating new agent doses for said plurality of agents as a function of said first inputs, said second inputs, and contributions which each agent makes to an overall effect to be achieved by said multi-agent therapy.
 10. The apparatus according to claim 9, wherein said third means calculates said new agent doses as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1}+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}}} \right)} \times {Agent2}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}$ ${FOE2} = {\frac{{Total}\quad {Proportional}\quad {Effect2}}{{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}\quad {Effect2}}}.}$


11. The apparatus according to claim 9, wherein said third means calculates said new agent doses as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1}+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2 To Calculate the Third Agent NAD3=CAD3−{[<(DANM3−CANM3)×FOE3>/<1+(CAD3/HIGH3)>]×CAD3}+LV3  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 EANM3={[(CAD3−PAD3)/PAD3]×[1+(PAD3/HIGH3)]×EANM2}+EANM2 if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3{circumflex over ( )}(CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM3<DANM3 and EANM3>CANM3, or if CANM3>DANM3 and EANM3<CANM3, then LV3=RESPONSE3×CAD3×(EANM3−CANM3)/CANM3[1.3{circumflex over ( )}(CAD3/HIGH3)] if CANM3<DANM3 and EANM3<CANM3, or if CANM3>DANM3 and EANM3>CANM3, then LV3=−[RESPONSE3×CAD3×(CANM3−EANM3)/CANM3]/[1.3{circumflex over ( )}(CAD3/HIGH3)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent PAD3=Previous agent dose of the third agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent CAD3=Current agent dose of the third agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent NAD3=New agent dose of the third agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent CANM3=Current agent numerical marker for the third agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent DANM3=Desired agent numerical marker for the third agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker FOE3=Factor of effect the third agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent HIGH3=The input parameter that is the high dose range for the third agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent RESPONSE3=Percent of total dose available for individualizing patient dose of the third agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) 1.3{circumflex over ( )}(CAD3/HIGH3)=1.3 raised to an exponent of (CAD3/HIGH3) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 Agent3 Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Agent3}\quad {Proportion}} = \frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect3}} = {\frac{{Dose3}/{Range3}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {{Dose3}/{Range3}}} \right)} \times {Agent3}\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}}} \\ {{Effect2} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}}} \\ {{Effect2} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}$ ${FOE3} = {\frac{{Total}\quad {Proportional}\quad {Effect3}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} + {{Total}\quad {Proportional}}} \\ {{Effect2} + {{Total}\quad {Proportional}\quad {Effect3}}} \end{matrix}}.}$


12. The apparatus according to claim 9, wherein said multi-agent therapy uses n agents, and said third means calculates said new agent doses as follows: To Calculate the First Agent NAD1=CAD1−{[<(DANM1−CANM1)×FOE1/CANM1>/<1+(CAD1/HIGH1)>]×CAD1+LV1 To Calculate the Second Agent NAD2=CAD2−{[<(DANM2−CANM2)×FOE2>/<1+(CAD2/HIGH2)>]×CAD2}+LV2 To Calculate the nth Agent NADn=CADn−{[<(DANMn−CANMn)×FOEn>/<1+(CADn/HIGHn)>]×CADn}+LVn  where: EANM1={[(CAD1−PAD1)/PAD1]×[1+(PAD1/HIGH1)]×PADM1}+PADM1 EANM2={[(CAD2−PAD2)/PAD2]×[1+(PAD2/HIGH2)]×EANM1}+EANM1 EANMn={[(CADn−PADn)/PADn]×[1+(PADn/HIGHn)]×EANM_(n−1)}+EANM_(n−1) if CANM1<DANM1 and EANM2>CANM1, or if CANM1>DANM1 and EANM2<CANM1, then LV1=RESPONSE1×CAD1×(EANM2−CANM1)/CANM1/[1.3 (CAD1/HIGH1)] if CANM1<DANM1 and EANM2<CANM1, or if CANM1>DANM1 and EANM2>CANM1, then LV1=−[RESPONSE1×CAD1×(CANM1−EANM2)/CANM1]/[1.3{circumflex over ( )}(CAD/HIGH)] if CANM2<DANM2 and EANM2>CANM2, or if CANM2>DANM2 and EANM2<CANM2, then LV2=RESPONSE2×CAD2×(EANM2−CANM2)/CANM2/[1.3{circumflex over ( )}(CAD2/HIGH2)] if CANM2<DANM2 and EANM2<CANM2, or if CANM2>DANM2 and EANM2>CANM2, then LV2=−[RESPONSE2×CAD2×(CANM2−EANM2)/CANM2]/[1.3{circumflex over ( )}(CAD2/HIGH2)] . . . LVn=RESPONSEn×CADn×(TEANM−CANMn)/CANMn/[1.3{circumflex over ( )}(CADn/HIGHn)] PAD1=Previous agent dose of the first agent PAD2=Previous agent dose of the second agent PADn=Previous agent dose of the nth agent CAD1=Current agent dose of the first agent CAD2=Current agent dose of the second agent CADn=Current agent dose of the nth agent NAD1=New agent dose of the first agent NAD2=New agent dose of the second agent NADn=New agent dose of the nth agent PADM1=Previous agent numerical marker for the first agent CANM1=Current agent numerical marker for the first agent CANM2=Current agent numerical marker for the second agent CANMn=Current agent numerical marker for the nth agent DANM1=Desired agent numerical marker for the first agent DANM2=Desired agent numerical marker for the second agent DANMn=Desired agent numerical marker for the nth agent FOE1=Factor of effect the first agent has on its associated numerical marker FOE2=Factor of effect the second agent has on its associated numerical marker FOEn=Factor of effect the nth agent has on its associated numerical marker HIGH1=The input parameter that is the high dose range for the first agent HIGH2=The input parameter that is the high dose range for the second agent HIGHn=The input parameter that is the high dose range for the nth agent RESPONSE1=Percent of total dose available for individualizing patient dose of the first agent RESPONSE2=Percent of total dose available for individualizing patient dose of the second agent RESPONSEn=Percent of total dose available for individualizing patient dose of the nth agent 1.3{circumflex over ( )}(CAD1/HIGH1)=1.3 raised to an exponent of (CAD1/HIGH1) 1.3{circumflex over ( )}(CAD2/HIGH2)=1.3 raised to an exponent of (CAD2/HIGH2) 1.3{circumflex over ( )}(CADn/HIGHn)=1.3 raised to an exponent of (CADn/HIGHn) To Calculate the Proportion of Effect Based on the Amount of Agent and the Agent's Intrinsic Effect Agent1 Effect=1 Agent2 Effect=1 Agent n Effect=1 ${{Agent1}\quad {Proportion}} = \frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent2}\quad {Proportion}} = \frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Agent}\quad n\quad {Proportion}} = \frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)}$ ${{Total}\quad {Proportion}\quad {al}{\quad \quad}{Effect1}} = {\frac{{Dose1}/{Range1}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent1}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect2}} = {\frac{{Dose2}/{Range2}}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent2}\quad {Effect}}$ ${{Total}\quad {Proportional}\quad {Effect}\quad n} = {\frac{{Dose}\quad {n/{Range}}\quad n}{\left( {{{Dose1}/{Range1}} + {{Dose2}/{Range2}} + {\ldots \quad {Dose}\quad {n/{Range}}\quad n}} \right)} \times {Agent}\quad n\quad {Effect}}$ ${FOE1} = \frac{{Total}\quad {Proportional}\quad {Effect1}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOE2} = \frac{{Total}\quad {Proportional}\quad {Effect2}}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}$ ${FOEn} = {\frac{{Total}\quad {Proportional}\quad {Effect}\quad n}{\begin{matrix} {{{Total}\quad {Proportional}\quad {Effect1}} +} \\ {{{Total}\quad {Proportional}\quad {Effect2}} + {\ldots \quad {Total}\quad {Proportional}\quad {Effect}\quad n}} \end{matrix}}.}$ 